Difference between revisions of "1963 AHSME Problems/Problem 40"
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<cmath>x+9-3\sqrt[3]{(x+9)^2(x-9)}+3\sqrt[3]{(x+9)(x-9)^2}-x+9=27,</cmath>so <cmath>18-3\sqrt[3]{(x-9)(x+9)}(\sqrt[3]{x+9}-\sqrt[3]{x-9})=27\implies 3\sqrt[3]{x^2-81}=-3.</cmath> Dividing both sides by 3 and cubing, we find <math>x^2=80</math>, which is between <math>\boxed{(C)75\text{ and }85}</math>. | <cmath>x+9-3\sqrt[3]{(x+9)^2(x-9)}+3\sqrt[3]{(x+9)(x-9)^2}-x+9=27,</cmath>so <cmath>18-3\sqrt[3]{(x-9)(x+9)}(\sqrt[3]{x+9}-\sqrt[3]{x-9})=27\implies 3\sqrt[3]{x^2-81}=-3.</cmath> Dividing both sides by 3 and cubing, we find <math>x^2=80</math>, which is between <math>\boxed{(C)75\text{ and }85}</math>. | ||
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==See Also== | ==See Also== |
Revision as of 10:10, 6 January 2021
Problem
If is a number satisfying the equation , then is between:
Solution 1
Let and . Cubing these equations, we get and , so . The left-hand side factors as
However, from the given equation , we get . Then , so .
Squaring the equation , we get . Subtracting this equation from the equation , we get , so . But and , so , so . Cubing both sides, we get , so . The answer is .
Solution 2
i.e,
if the sum of three numbers is zero, then their sum of cubes is thrice the product of each number. then, . by solving this, we get . this gives the step what we had done in solution 1.The answer is .
Solution 3
Cubing both sides, we get so Dividing both sides by 3 and cubing, we find , which is between .
~pfalcon
See Also
1963 AHSC (Problems • Answer Key • Resources) | ||
Preceded by Problem 39 |
Followed by Last Problem | |
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All AHSME Problems and Solutions |
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